Asynchronous multisplitting two-stage iterations for systems of weakly nonlinear equations

Asynchronous parallel multlsplitting nonlinear iterative methods are established for the system of nonlinear algebraic equations A~p(x) -{-T¢(x) = b, with A, T E L(R n) being matrices having particular properties, ~, ~b : R n ---\* R n being diagonal and continuous mappings, and b E R n a known vect

For Toeplitz system of weakly nonlinear equations, by using the separability and strong dominance between the linear and the nonlinear terms and using the circulant and skew-circulant splitting (CSCS) iteration technique, we establish two nonlinear composite iteration schemes, called Picard-CSCS and

In this paper, a partially asynchronous block Broyden method is presented for solving nonlinear systems of equations of the form F(x)= 0. Sufficient conditions that guarantee its local convergence are given. In particular, local convergence is shown when the Jacobian F'(x\*) is an H-matrix, where x\